The topology on Berkovich affine lines over complete valuation rings

Abstract

In this article, we give a full description of the topology of the one dimensional affine analytic space AR1 over a complete valuation ring R (i.e. a valuation ring with "real valued valuation" which is complete under the induced metric), when its field of fractions K is algebraically closed. In particular, we show that AR1 is both connected and locally path connected. Furthermore, AR1 is the completion of K× (1,∞) under a canonical uniform structure. As an application, we describe the Berkovich spectrum M(Zp[G]) of the Banach group ring Zp[G] of a cyclic p-group G over the ring Zp of p-adic integers.